Generalized equivariant model structures on CatI
Abstract
Let I be a small category, C be the category Cat, Ac or Pos of small categories, acyclic categories, or posets, respectively. Let O be a locally small class of objects in SetI such that colimI O=* for every O∈ O. We prove that CI admits the O-equivariant model structure in the sense of Farjoun, and that it is Quillen equivalent to the O-equivariant model structure on sSetI. This generalizes previous results of Bohmann-Mazur-Osorno-Ozornova-Ponto-Yarnall and of May-Stephan-Zakharevich when I=G is a discrete group and O is the set of orbits of G.
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